An alternative perspective on projectivity of modules

Abstract

Similar to the idea of relative projectivity, we introduce the notion of relative subprojectivity, which is an alternative way to measure the projectivity of a module. Given modules M and N, M is said to be N-subprojective if for every epimorphism g:B → N and homomorphism f:M → N, then there exists a homomorphism h:M → B such that gh=f. For a module M, the subprojectivity domain of M is defined to be the collection of all modules N such that M is N-subprojective. A module is projective if and only if its subprojectivity domain consists of all modules. Opposite to this idea, a module M is said to be subprojectively poor, or sp-poor if its subprojectivity domain is as small as conceivably possible, that is, consisting of exactly the projective modules. Properties of subprojectivity domains and sp-poor modules are studied. In particular, the existence of an sp-poor module is attained for artinian serial rings.